Extensions of braid group representations to the monoid of singular braids

Abstract

Given a representation Bn Gn of the braid group Bn, n ≥ 2 into a group Gn, we are considering the problem of whether it is possible to extend this representation to a representation SMn An, where SMn is the singular braid monoid and An is an associative algebra, in which the group of units contains Gn. We also investigate the possibility of extending the representation SMn An to a representation SBn An of the singular braid group SBn. On the other hand, given two linear representations 1, 2 H GLm() of a group H into a general linear group over a field , we define the defect of one of these representations with respect to the other. Furthermore, we construct a linear representation of SBn which is an extension of the Lawrence-Krammer-Bigelow representation (LKBR) and compute the defect of this extension with respect to the exterior product of two extensions of the Burau representation. Finally, we discuss how to derive an invariant of classical links from the Lawrence-Krammer-Bigelow representation.